Answer:
The real root is -13
The value of A is 11 and B is -24
Step-by-step explanation:
The given equation is [tex]z^3+Az^2+Bz+26=0[/tex].
If [tex]1+i[/tex] is a root then then the complex conjugate [tex](1-i)[/tex] is also a root.
Let us now derive the quadratic equation that gave rise to this complex roots.
By the factor theorem, we get;
[tex](z+(-1-i))(z+(-1+i)=z^2-2z+2[/tex]
Now the
Now the fully factored cubic polynomial will be of the form:
[tex](z+c)(x^2-2x+2)=0[/tex]
By comparing constant terms; 2c=26. This means c=13
Hence the required polynomial is [tex](z+13)(x^2-2x+2)=0[/tex]
Therefore the real root is z=-13
We now expand fully to get:
[tex]z^3+11z^2-24z+26=0[/tex]
By comparing coefficients; A=11, and B=-24
